There are 40 student in a hostel, 24 of them are fluent I English and 22 of them are fluent in French. Each student is fluent in at least one of the two languages.illustrate this information on a Venn diagram.how many student are fluent in both English and French? How many student are fluent in only French. How many student are in only English. How many student are fluent in exactly one of the two languages?
Do it for me please
Cannot do Venn diagrams on these posts.
Solve
Solve it for me please
There are 40 students in a hotel 24 of them are fluent in
There are 40 students in a hostel in English and 22 of them are fluent in French .Each students is fluent in at least one of the two languages.
To illustrate this information on a Venn diagram, we can draw two circles that partially overlap. One circle represents the students who are fluent in English, and the other circle represents the students who are fluent in French.
Now, let's consider the given information. We know that there are 40 students in total, and each student is fluent in at least one of the two languages.
From the given information, we know that 24 students are fluent in English and 22 students are fluent in French. To find out how many students are fluent in both English and French, we need to find the overlapping region between the two circles. Let's say this number is 'x'.
To find the number of students who are fluent in only French, we need to subtract the number of students who are fluent in both languages (x) from the total number of students who are fluent in French (22). So, the number of students fluent in only French is 22 - x.
Similarly, to find the number of students who are fluent in only English, we need to subtract the number of students who are fluent in both languages (x) from the total number of students who are fluent in English (24). So, the number of students fluent in only English is 24 - x.
Now, to find the number of students who are fluent in exactly one of the two languages, we need to add the number of students who are fluent in only English (24 - x) to the number of students who are fluent in only French (22 - x). So, the number of students fluent in exactly one language is (24 - x) + (22 - x).
To summarize:
- Number of students fluent in both English and French: x
- Number of students fluent in only French: 22 - x
- Number of students fluent in only English: 24 - x
- Number of students fluent in exactly one of the two languages: (24 - x) + (22 - x)
Please note that without the specific value of 'x', we cannot determine the exact numbers for each category.